Trapezoid PQRS was rotated 60° around a point. Which point could have been the center of this rotation?
i don't know i need the answer to
Point B
To determine which point could have been the center of rotation, we need to understand that the center of rotation is a point around which an object is rotated. In this case, Trapezoid PQRS was rotated 60° around a point.
To find the possible center of rotation, we can follow these steps:
1. Draw Trapezoid PQRS on a piece of paper or visualize it in your mind.
2. Choose any of the vertices (P, Q, R, or S) as a reference point.
3. Rotate the trapezoid 60° clockwise or counterclockwise around the reference point.
4. Observe the position of the other vertices after rotation.
5. If any of the other three vertices (besides the reference point) coincide with their original position after the rotation, then the reference point is the center of rotation.
Repeat the process from Step 2 for the remaining vertices to check if any of them coincide with their original positions.
Note: If none of the vertices coincide with their original positions, it means that the trapezoid was not rotated exactly 60° around any of the given points.